Rewriting the equation as z^2=(x-1)(y-1) , we can cancel a factor of y-1 from the first term to get \frac{(y-1)^2}{(y-1)^2-z^2}=\frac{(y-1)^2}{(y-1)^2-(x-1)(y-1)}=\frac{(y-1)}{(y-1)-(x-1)}=\frac{(y-1)}{y-x} ...

I think you are quite over-complicating it. If X,Y,Z are uniformly distributed over [0,1] and independent, \begin{eqnarray*}E=\mathbb{E}[(X+Y+Z)^2]&=&\iiint_{[0,1]^3}(x+y+z)^2\,d\mu\\&=&\iiint_{[0,1]^3}(x^2+y^2+z^2+2xy+2xz+2yz)\,d\mu\\&=&3\cdot\frac{1}{3}+3\cdot 2\cdot \frac{1}{4}=\color{red}{\frac{5}{2}}.\end{eqnarray*} ...

(A^2+B^2+C^2)(X^2+Y^2+Z^2)=(AX+BY+CZ)^2 =>(A^2 X^2 + A^2 Y^2 + A^2 Z^2) + (B^2 X^2 + B^2 Y^2 + B^2 Z^2) + (C^2 X^2 + C^2 Y^2 + C^2 Z^2) = A^2 X^2 + B^2 Y^2 + C^2 Z^2 + 2ABXY + 2BCYZ ...

Firstly, to address matters of notation, C^{20}_2 = \binom{20}{2} = \frac{20!}{18! \times 2!} Now, to address the coefficient of w^3x^5z^2, this is effectively the same as "picking" w 3 ...

\displaystyle{\left(\frac{{119}}{{20}},{3}\right)} Explanation: Write in vertex form for a left or right opening parabola, \displaystyle{x}={a}{\left({y}-{k}\right)}^{{2}}+{h} : \displaystyle{x}=-{5}{\left({y}-{3}\right)}^{{2}}+{6}{T}{h}{e}{d}{i}{r}{e}{c}{t}{e}{d}{f}{o}{c}{a}{l}\le{n}{>}{h},{f},{f}{\quad\text{or}\quad}{a}{l}{l}{p}{a}{r}{a}{b}{o}{l}{a}{s}{i}{s}: ...

Since x,y,z are sides of a triangle, we have |x-y| < z Squaring both sides we get (x-y)^2=x^2 +y^2 -2xy < z^2 Setting up similar inequalities and adding, we get the desired result. Your proof ...